Titlebook: Chaos; A Program Collection H. J. Korsch,H.-J. Jodl Book 19992nd edition Springer-Verlag Berlin Heidelberg 1999 Chaostheorie.Fractals.Frakt

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Hydrogels in Controlled Drug Delivery,g in a constant gravitational field (compare Fig. 5.1). For simplicity, only a planar motion of the double pendulum is considered. Such a planar double pendulum is most easily constructed as a mechanical model to demonstrate the complex dynamics of nonlinear (i.e. typical) systems in mechanics, in c

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Biopolymers in Controlled Release Systems,ecade. Most of this work has been devoted to bounded systems. More recently, however, irregular chaotic phenomena have also been observed and studied for open (scattering) systems. For recent reviews of chaotic scattering, see the articles by Eckhardt [6. 1], Smilansky [6.2], and Blümel [6.3]. Chaot

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Bioadhesive Intraoral Release Systems,g nonlinear Hamiltonian dynamics. The problem was introduced by Fermi [7.1] in connection with studies of the acceleration mechanism of cosmic particles through fluctuating magnetic fields. Similar mechanisms have been studied for accelerating cosmic rockets by planetary or stellar gravitational fie

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Hydrogels in Controlled Drug Delivery,tics of nonlinear dynamics, namely discrete mappings. An example of such a discrete system is provided by a stroboscopic map, where a system is only observed at well—defined time steps ... In some situations, the discrete mapping arises directly from the nature of the system, as for instance in popu

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Bioadhesive Intraoral Release Systems,cause they are discrete, such maps are much simpler to study (both numerically and analytically) than continuous differential equations. In general, the maps can be written as . where . = (..,..., ..) is the state vector of the system — for example, a vector in N-dimensional phase space — and . = (.

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